"Rubberband" Brunnian Links: Difference between revisions
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A "Rubberband" [[Brunnian link]] is obtained by connecting unknots in a closed chain as illustrated in the diagram of the 10-component link, where the last knot gets connected to the first one. |
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=="Rubberband" Brunnian Links== |
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A "Rubberband" Brunnian link is obtained by connecting unknots in a closed chain as illustrated in the diagram of the 10-component link, where the last knot gets connected to the first one. |
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{| |
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For instance, let us draw the links with three, four, and five components and compute their Jones polynomials: |
For instance, let us draw the links with three, four, and five components and compute their Jones polynomials: |
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<!--$$RBB3=RubberBandBrunnian[3] |
<!--$$DrawMorseLink[RBB3=RubberBandBrunnian[3]]$$--> |
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RBB4=RubberBandBrunnian[4]; |
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RBB5=RubberBandBrunnian[5];$$--> |
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<!--Robot Land, no human edits to "END"--> |
<!--Robot Land, no human edits to "END"--> |
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{{ |
{{Graphics| |
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n = |
n = 4 | |
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in = <nowiki>RBB3=RubberBandBrunnian[3] |
in = <nowiki>DrawMorseLink[RBB3=RubberBandBrunnian[3]]</nowiki> | |
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img= Rubberband_Brunnian_Links_Out_3.gif | |
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RBB4=RubberBandBrunnian[4]; |
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out= <nowiki>-Graphics-</nowiki>}} |
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<!--END--> |
<!--END--> |
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<!--$$Jones[RBB3][q]$$--> |
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<!--$$DrawMorseLink/@{RBB3,RBB4,RBB5}$$--> |
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<!--Robot Land, no human edits to "END"--> |
<!--Robot Land, no human edits to "END"--> |
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{{InOut| |
{{InOut| |
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n = |
n = 5 | |
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in = <nowiki> |
in = <nowiki>Jones[RBB3][q]</nowiki> | |
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out= <nowiki> 2 3 4 5 7 8 9 10 |
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out= <nowiki>{-Graphics-, -Graphics-, -Graphics-}</nowiki>}} |
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-q + 5 q - 11 q + 14 q - 10 q + 11 q - 18 q + 24 q - 18 q + |
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11 13 14 15 16 17 |
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11 q - 10 q + 14 q - 11 q + 5 q - q</nowiki>}} |
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<!--END--> |
<!--END--> |
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<!--$$DrawMorseLink[RBB4=RubberBandBrunnian[4]]$$--> |
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<!--$$RBJones= Jones[#][q] & /@ {RBB3, RBB4, RBB5}$$--> |
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<!--Robot Land, no human edits to "END"--> |
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{{Graphics| |
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n = 7 | |
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in = <nowiki>DrawMorseLink[RBB4=RubberBandBrunnian[4]]</nowiki> | |
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img= Rubberband_Brunnian_Links_Out_6.gif | |
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out= <nowiki>-Graphics-</nowiki>}} |
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<!--END--> |
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<!--$$Jones[RBB4][q]$$--> |
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<!--Robot Land, no human edits to "END"--> |
<!--Robot Land, no human edits to "END"--> |
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{{InOut| |
{{InOut| |
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n = |
n = 8 | |
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in = <nowiki> |
in = <nowiki>Jones[RBB4][q]</nowiki> | |
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out= <nowiki> |
out= <nowiki> 3/2 5/2 7/2 9/2 11/2 13/2 15/2 |
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-q + 7 q - 24 q + 49 q - 56 q + 18 q + 51 q - |
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17/2 19/2 21/2 23/2 25/2 27/2 |
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111 q + 131 q - 100 q + 32 q + 32 q - 100 q + |
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29/2 31/2 33/2 35/2 37/2 39/2 |
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131 q - 111 q + 51 q + 18 q - 56 q + 49 q - |
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41/2 43/2 45/2 |
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24 q + 7 q - q</nowiki>}} |
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<!--END--> |
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<!--$$DrawMorseLink[RBB5=RubberBandBrunnian[5]]$$--> |
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<!--Robot Land, no human edits to "END"--> |
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{{Graphics| |
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n = 10 | |
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in = <nowiki>DrawMorseLink[RBB5=RubberBandBrunnian[5]]</nowiki> | |
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img= Rubberband_Brunnian_Links_Out_9.gif | |
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out= <nowiki>-Graphics-</nowiki>}} |
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<!--END--> |
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<!--$$Jones[RBB5][q]$$--> |
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<!--Robot Land, no human edits to "END"--> |
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{{InOut| |
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n = 11 | |
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in = <nowiki>Jones[RBB5][q]</nowiki> | |
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out= <nowiki> 2 3 4 5 6 7 8 9 |
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-q + 9 q - 40 q + 110 q - 189 q + 167 q + 57 q - 414 q + |
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10 11 12 13 14 15 16 |
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660 q - 581 q + 189 q + 305 q - 672 q + 816 q - 672 q + |
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17 18 19 20 21 22 23 |
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305 q + 189 q - 581 q + 660 q - 414 q + 57 q + 167 q - |
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24 25 26 27 28 |
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189 q + 110 q - 40 q + 9 q - q</nowiki>}} |
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10 11 12 13 14 15 |
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660 q - 581 q + 189 q + 305 q - 672 q + 816 q - |
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16 17 18 19 20 21 22 |
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672 q + 305 q + 189 q - 581 q + 660 q - 414 q + 57 q + |
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23 24 25 26 27 28 |
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167 q - 189 q + 110 q - 40 q + 9 q - q }</nowiki>}} |
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<!--END--> |
<!--END--> |
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We can also check that when one component is removed the remaining link is trivial: |
We can also check that when one component is removed the remaining link is trivial: |
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<!--$$Import["http://katlas.org/w/index.php?title=SubLink.m&action=raw"];$$--> |
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<!--Robot Land, no human edits to "END"--> |
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{{In| |
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n = 12 | |
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in = <nowiki>Import["http://katlas.org/w/index.php?title=SubLink.m&action=raw"];</nowiki>}} |
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<!--END--> |
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<!--$$S = SubLink[RubberBandBrunnian[5], {1, 2, 3, 4}];$$--> |
<!--$$S = SubLink[RubberBandBrunnian[5], {1, 2, 3, 4}];$$--> |
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<!--Robot Land, no human edits to "END"--> |
<!--Robot Land, no human edits to "END"--> |
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{{In| |
{{In| |
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n = |
n = 13 | |
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in = <nowiki>S = SubLink[RubberBandBrunnian[5], {1, 2, 3, 4}];</nowiki>}} |
in = <nowiki>S = SubLink[RubberBandBrunnian[5], {1, 2, 3, 4}];</nowiki>}} |
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<!--END--> |
<!--END--> |
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{{InOut| |
{{InOut| |
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n = |
n = 14 | |
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in = <nowiki>J=Factor[Jones[S][q]]</nowiki> | |
in = <nowiki>J=Factor[Jones[S][q]]</nowiki> | |
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out= <nowiki> |
out= <nowiki> 6 3 |
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-(q (1 + q) )</nowiki>}} |
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-((Sqrt[q] SubLink[PD[q P[1, 12] P[5, 10] + -----------------, |
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1/4 |
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q |
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1/4 P[2, 12] P[6, 14] |
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q P[2, 14] P[6, 12] + -----------------, |
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1/4 |
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q |
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1/4 P[5, 11] P[8, 13] |
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q P[5, 13] P[8, 11] + -----------------, |
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1/4 |
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q |
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1/4 P[6, 13] P[9, 15] |
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q P[6, 15] P[9, 13] + -----------------, |
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1/4 |
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q |
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1/4 P[0, 10] P[4, 16] |
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q P[0, 16] P[4, 10] + -----------------, |
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1/4 |
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q |
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1/4 P[4, 11] P[8, 17] |
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q P[4, 17] P[8, 11] + -----------------, |
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1/4 |
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q |
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P[3, 19] P[7, 14] 1/4 |
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----------------- + q P[3, 14] P[7, 19], |
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1/4 |
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q |
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P[7, 18] P[9, 15] 1/4 |
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----------------- + q P[7, 15] P[9, 18], |
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1/4 |
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q |
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1/4 P[17, 26] P[21, 28] |
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q P[17, 28] P[21, 26] + -------------------, |
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1/4 |
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q |
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1/4 P[18, 28] P[22, 30] |
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q P[18, 30] P[22, 28] + -------------------, |
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1/4 |
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q |
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1/4 P[21, 27] P[24, 29] |
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q P[21, 29] P[24, 27] + -------------------, |
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1/4 |
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q |
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1/4 P[22, 29] P[25, 31] |
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q P[22, 31] P[25, 29] + -------------------, |
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1/4 |
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q |
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1/4 P[16, 26] P[20, 32] |
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q P[16, 32] P[20, 26] + -------------------, |
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1/4 |
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q |
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1/4 P[20, 27] P[24, 33] |
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q P[20, 33] P[24, 27] + -------------------, |
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1/4 |
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q |
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P[19, 35] P[23, 30] 1/4 |
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------------------- + q P[19, 30] P[23, 35], |
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1/4 |
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q |
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P[23, 34] P[25, 31] 1/4 |
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------------------- + q P[23, 31] P[25, 34], |
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1/4 |
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q |
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1/4 P[33, 42] P[37, 44] |
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q P[33, 44] P[37, 42] + -------------------, |
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1/4 |
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q |
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1/4 P[34, 44] P[38, 46] |
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q P[34, 46] P[38, 44] + -------------------, |
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1/4 |
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q |
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1/4 P[37, 43] P[40, 45] |
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q P[37, 45] P[40, 43] + -------------------, |
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1/4 |
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q |
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1/4 P[38, 45] P[41, 47] |
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q P[38, 47] P[41, 45] + -------------------, |
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1/4 |
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q |
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1/4 P[32, 42] P[36, 48] |
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q P[32, 48] P[36, 42] + -------------------, |
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1/4 |
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q |
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1/4 P[36, 43] P[40, 49] |
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q P[36, 49] P[40, 43] + -------------------, |
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1/4 |
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q |
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P[35, 51] P[39, 46] 1/4 |
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------------------- + q P[35, 46] P[39, 51], |
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1/4 |
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q |
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P[39, 50] P[41, 47] 1/4 |
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------------------- + q P[39, 47] P[41, 50], |
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1/4 |
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q |
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1/4 P[49, 58] P[53, 60] |
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q P[49, 60] P[53, 58] + -------------------, |
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1/4 |
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q |
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1/4 P[50, 60] P[54, 62] |
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q P[50, 62] P[54, 60] + -------------------, |
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1/4 |
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q |
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1/4 P[53, 59] P[56, 61] |
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q P[53, 61] P[56, 59] + -------------------, |
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1/4 |
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q |
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1/4 P[54, 61] P[57, 63] |
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q P[54, 63] P[57, 61] + -------------------, |
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1/4 |
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q |
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1/4 P[48, 58] P[52, 64] |
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q P[48, 64] P[52, 58] + -------------------, |
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1/4 |
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q |
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1/4 P[52, 59] P[56, 65] |
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q P[52, 65] P[56, 59] + -------------------, |
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1/4 |
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q |
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P[51, 67] P[55, 62] 1/4 |
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------------------- + q P[51, 62] P[55, 67], |
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1/4 |
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q |
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P[55, 66] P[57, 63] 1/4 |
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------------------- + q P[55, 63] P[57, 66], |
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1/4 |
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q |
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1/4 P[65, 74] P[69, 76] |
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q P[65, 76] P[69, 74] + -------------------, |
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1/4 |
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q |
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1/4 P[66, 76] P[70, 78] |
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q P[66, 78] P[70, 76] + -------------------, |
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1/4 |
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q |
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1/4 P[69, 75] P[72, 77] |
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q P[69, 77] P[72, 75] + -------------------, |
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1/4 |
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q |
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1/4 P[70, 77] P[73, 79] |
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q P[70, 79] P[73, 77] + -------------------, |
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1/4 |
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q |
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P[0, 68] P[64, 74] 1/4 |
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------------------ + q P[0, 64] P[68, 74], |
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1/4 |
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q |
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P[1, 72] P[68, 75] 1/4 |
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------------------ + q P[1, 68] P[72, 75], |
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1/4 |
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q |
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1/4 P[3, 67] P[71, 78] |
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q P[3, 71] P[67, 78] + ------------------, |
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1/4 |
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q |
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1/4 P[2, 71] P[73, 79] |
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q P[2, 73] P[71, 79] + ------------------], {1, 2, 3, 4}]) / |
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1/4 |
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q |
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(1 + q))</nowiki>}} |
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<!--END--> |
<!--END--> |
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==Brunnian Braids== |
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Similarly, in the case of Brunnian braids, removing one strand gives us a trivial braid. We can verify that using the following two programs. The first one constructs a Brunnian braid while the second one removes a selected strand: |
Similarly, in the case of Brunnian braids, removing one strand gives us a trivial braid. We can verify that using the following two programs. The first one constructs a Brunnian braid while the second one removes a selected strand: |
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{{In| |
{{In| |
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n = |
n = 15 | |
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in = <nowiki>BR /: Inverse[BR[n_, l_List]] := BR[n, -Reverse[l]]; |
in = <nowiki>BR /: Inverse[BR[n_, l_List]] := BR[n, -Reverse[l]]; |
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BR /: BR[n1_, l1_] ** BR[n2_, l2_] := BR[Max[n1, n2], Join[l1, l2]]; |
BR /: BR[n1_, l1_] ** BR[n2_, l2_] := BR[Max[n1, n2], Join[l1, l2]]; |
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{{In| |
{{In| |
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n = |
n = 16 | |
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in = <nowiki>DeleteStrand[k_, BR[n_, l_List]] := BR[n - 1, DeleteStrand[k, l]]; |
in = <nowiki>DeleteStrand[k_, BR[n_, l_List]] := BR[n - 1, DeleteStrand[k, l]]; |
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DeleteStrand[k_, {}] = {}; |
DeleteStrand[k_, {}] = {}; |
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{{Graphics| |
{{Graphics| |
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n = |
n = 18 | |
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in = <nowiki>(b = BrunnianBraid[4]) // BraidPlot </nowiki> | |
in = <nowiki>(b = BrunnianBraid[4]) // BraidPlot </nowiki> | |
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img= |
img= Rubberband_Brunnian_Links_Out_17.gif | |
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out= <nowiki>-Graphics-</nowiki>}} |
out= <nowiki>-Graphics-</nowiki>}} |
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<!--END--> |
<!--END--> |
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{{InOut| |
{{InOut| |
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n = |
n = 19 | |
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in = <nowiki>Jones[b][q]</nowiki> | |
in = <nowiki>Jones[b][q]</nowiki> | |
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out= <nowiki> -(11/2) 4 6 5 5 1 3/2 |
out= <nowiki> -(11/2) 4 6 5 5 1 3/2 |
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{{Graphics| |
{{Graphics| |
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n = |
n = 21 | |
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in = <nowiki>(bb = DeleteStrand[4, b]) // BraidPlot</nowiki> | |
in = <nowiki>(bb = DeleteStrand[4, b]) // BraidPlot</nowiki> | |
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img= |
img= Rubberband_Brunnian_Links_Out_20.gif | |
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out= <nowiki>-Graphics-</nowiki>}} |
out= <nowiki>-Graphics-</nowiki>}} |
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<!--END--> |
<!--END--> |
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{{InOut| |
{{InOut| |
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n = |
n = 22 | |
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in = <nowiki>Jones[#][q] & /@ {bb, BR[3, {}]}</nowiki> | |
in = <nowiki>Jones[#][q] & /@ {bb, BR[3, {}]}</nowiki> | |
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out= <nowiki> 1 1 |
out= <nowiki> 1 1 |
Latest revision as of 14:03, 20 October 2013
A "Rubberband" Brunnian link is obtained by connecting unknots in a closed chain as illustrated in the diagram of the 10-component link, where the last knot gets connected to the first one.
If we number the strands in one section of the link as shown and proceed with numbering each following section in the same manner, we can get its PD form. The PD of any "Rubberband" link can be generated in this way by varying the desired number of components:
(For In[1] see Setup)
In[1]:=
|
K0 =
PD[X[1, 10, 5, 12], X[2, 12, 6, 14], X[5, 11, 8, 13],
X[6, 13, 9, 15], X[10, 0, 16, 4], X[11, 4, 17, 8], X[14, 7, 19, 3],
X[15, 9, 18, 7]];
|
In[2]:=
|
RubberBandBrunnian[n_] :=
Join @@ Table[K0 /. j_Integer :> j + 16 k, {k, 0, n - 1}] /. {16
n -> 0, 16 n + 1 -> 1, 16 n + 2 -> 2, 16 n + 3 -> 3}
|
For instance, let us draw the links with three, four, and five components and compute their Jones polynomials:
In[4]:=
|
DrawMorseLink[RBB3=RubberBandBrunnian[3]]
|
Out[4]=
|
-Graphics-
|
In[5]:=
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Jones[RBB3][q]
|
Out[5]=
|
2 3 4 5 7 8 9 10
-q + 5 q - 11 q + 14 q - 10 q + 11 q - 18 q + 24 q - 18 q +
11 13 14 15 16 17
11 q - 10 q + 14 q - 11 q + 5 q - q
|
In[7]:=
|
DrawMorseLink[RBB4=RubberBandBrunnian[4]]
|
Out[7]=
|
-Graphics-
|
In[8]:=
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Jones[RBB4][q]
|
Out[8]=
|
3/2 5/2 7/2 9/2 11/2 13/2 15/2
-q + 7 q - 24 q + 49 q - 56 q + 18 q + 51 q -
17/2 19/2 21/2 23/2 25/2 27/2
111 q + 131 q - 100 q + 32 q + 32 q - 100 q +
29/2 31/2 33/2 35/2 37/2 39/2
131 q - 111 q + 51 q + 18 q - 56 q + 49 q -
41/2 43/2 45/2
24 q + 7 q - q
|
In[10]:=
|
DrawMorseLink[RBB5=RubberBandBrunnian[5]]
|
Out[10]=
|
-Graphics-
|
In[11]:=
|
Jones[RBB5][q]
|
Out[11]=
|
2 3 4 5 6 7 8 9
-q + 9 q - 40 q + 110 q - 189 q + 167 q + 57 q - 414 q +
10 11 12 13 14 15 16
660 q - 581 q + 189 q + 305 q - 672 q + 816 q - 672 q +
17 18 19 20 21 22 23
305 q + 189 q - 581 q + 660 q - 414 q + 57 q + 167 q -
24 25 26 27 28
189 q + 110 q - 40 q + 9 q - q
|
We can also check that when one component is removed the remaining link is trivial:
In[12]:=
|
Import["http://katlas.org/w/index.php?title=SubLink.m&action=raw"];
|
In[13]:=
|
S = SubLink[RubberBandBrunnian[5], {1, 2, 3, 4}];
|
In[14]:=
|
J=Factor[Jones[S][q]]
|
Out[14]=
|
6 3
-(q (1 + q) )
|
Similarly, in the case of Brunnian braids, removing one strand gives us a trivial braid. We can verify that using the following two programs. The first one constructs a Brunnian braid while the second one removes a selected strand:
In[15]:=
|
BR /: Inverse[BR[n_, l_List]] := BR[n, -Reverse[l]];
BR /: BR[n1_, l1_] ** BR[n2_, l2_] := BR[Max[n1, n2], Join[l1, l2]];
BrunnianBraid[2] = BR[2, {1, 1}];
BrunnianBraid[n_] /; n > 2 := Module[
{b0},
b0 = BrunnianBraid[n - 1];
((b0 ** BR[n, {n - 1, n - 1}]) ** Inverse[b0]) **
BR[n, {1 - n, 1 - n}]
]
|
In[16]:=
|
DeleteStrand[k_, BR[n_, l_List]] := BR[n - 1, DeleteStrand[k, l]];
DeleteStrand[k_, {}] = {};
DeleteStrand[k_, {j1_, js___}] := Which[
k < Abs[j1], {j1 - Sign[j1]}~Join~DeleteStrand[k, {js}],
k == Abs[j1], DeleteStrand[k + 1, {js}],
k == Abs[j1] + 1, DeleteStrand[k - 1, {js}],
k > Abs[j1] + 1, {j1}~Join~DeleteStrand[k, {js}]
]
|
Testing for the Brunnian braid with four strands, we get:
In[18]:=
|
(b = BrunnianBraid[4]) // BraidPlot
|
Out[18]=
|
-Graphics-
|
In[19]:=
|
Jones[b][q]
|
Out[19]=
|
-(11/2) 4 6 5 5 1 3/2
-q + ---- - ---- + ---- - ---- - ------- - Sqrt[q] - 5 q +
9/2 7/2 5/2 3/2 Sqrt[q]
q q q q
5/2 7/2 9/2 11/2
5 q - 6 q + 4 q - q
|
In[21]:=
|
(bb = DeleteStrand[4, b]) // BraidPlot
|
Out[21]=
|
-Graphics-
|
In[22]:=
|
Jones[#][q] & /@ {bb, BR[3, {}]}
|
Out[22]=
|
1 1
{2 + - + q, 2 + - + q}
q q
|